I’m explaining why any presheaf category is an elementary topos, meaning that

• it has finite colimits;
• it has finite limits;
• it’s cartesian closed.
• it has a subboject classifier.

Last time I tackled the first two bullet points; now let’s do the third. For starters, what’s a cartesian closed category, and why are they so nice? Answering this question will get us into some more ‘philosophical’ aspects of topos theory.

The category of sets has ‘sums’, also...